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Math
Given that the largest pair of prime numbers known is 242206083x2^38880 +- 1. do you think that it will be possible to prove the twin primes conjecture with the relatively newfound idea that the nontrivial roots the Riemann Zeta Function t (s) = (sum)(1/n^s) = (product) (1 - p^-s)^-1 have a real part 1/2 on the complex plane?
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no
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Ok did what you just said have a point or did you just list a bunch of random equations?
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easy
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:idea:
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well? I for one think that it is possible that the twin prime conjecture be proved soon, what with the proof of the infinite prime conjecture and the fact that prime number fomulae have been greatly developed only recently.
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... ... ... ... my brain is bleeding |
i second the bleeding brain
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It's kind of obvious there are infinite primes dude -_-.
And infinite primes means infinite twin primes. |
I agree with Brain, given the nature of infinity.
And some parts of your question don't make much sense... it feels like you threw in the math part but didn't make it a complete sentence. |
Hmm, perhaps you misunderstand. It's one thing to say there are an infinity of primes or twin primes, but I was pondering whether it will be proven.
Quoth me, w/o math: 'Given that the largest pair of prime numbers known is really big. do you think that it will be possible to prove the twin primes conjecture with the relatively newfound idea that those crazy mathemagicians came up with?" |
I got lost at prime...
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Ok...somebody obvoiusly hacked Vx's account or something...
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Ok...somebody obvoiusly hacked Vx's account or something...
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Ok...someone double posted. ahahahahahahahahahahhahahahaahahahahahhaah I'm awsome.
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Or maybe he just copied what someone said on another site. :P
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the answer is 12
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ya that's what i was thinking he did too
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